Given: [A]0=8[B]0, t1/2(A)=10min, t1/2(B)=40min. Both reactants follow first order kinetics.
Find: The time t when [A]=[B].
For first order decay,
[A]=[A]0e−kAt
and
[B]=[B]0e−kBtAt the required time, concentrations become equal:
[A]0e−kAt=[B]0e−kBt
Using [A]0=8[B]0,
8[B]0e−kAt=[B]0e−kBt
So,
8=e(kA−kB)t
Taking logarithm,
ln8=(kA−kB)t
Hence,
t=kA−kBln8For a first order reaction,
k=t1/2ln2
Therefore,
kA=10ln2
and
kB=40ln2
Substituting,
t=10ln2−40ln2ln8Now simplify:
ln8=ln23=3ln2
So,
t=ln2(101−401)3ln2
=404−13
=4033=40Therefore, the concentration of both reactants becomes same after 40min. The correct option is D.